Proof of Nuprl Lemma : implies-le-face-lattice-join

Step * 1 of Lemma implies-le-face-lattice-join

1. T : Type@i'
2. eq : EqDecider(T)@i
3. Point(face-lattice(T;eq)) ⊆r fset(fset(T + T))
4. x : Point(face-lattice(T;eq))@i
5. y : Point(face-lattice(T;eq))@i
6. z : Point(face-lattice(T;eq))@i
7. ∀s:fset(T + T). (s ∈ z ⇒ ((↑ac-covers(union-deq(T;T;eq;eq);x;s)) ∨ (↑ac-covers(union-deq(T;T;eq;eq);y;s))))@i
8. s : fset(T + T)@i
9. s ∈ z@i
⊢ ↑ac-covers(union-deq(T;T;eq;eq);x ∨ y;s)
BY
{ (InstHyp [⌜s⌝] (-3)⋅ THENA Auto) }

1
1. T : Type@i'
2. eq : EqDecider(T)@i
3. Point(face-lattice(T;eq)) ⊆r fset(fset(T + T))
4. x : Point(face-lattice(T;eq))@i
5. y : Point(face-lattice(T;eq))@i
6. z : Point(face-lattice(T;eq))@i
7. ∀s:fset(T + T). (s ∈ z ⇒ ((↑ac-covers(union-deq(T;T;eq;eq);x;s)) ∨ (↑ac-covers(union-deq(T;T;eq;eq);y;s))))@i
8. s : fset(T + T)@i
9. s ∈ z@i
10. (↑ac-covers(union-deq(T;T;eq;eq);x;s)) ∨ (↑ac-covers(union-deq(T;T;eq;eq);y;s))
⊢ ↑ac-covers(union-deq(T;T;eq;eq);x ∨ y;s)

Latex:

Latex:
1. T : Type@i' 2. eq : EqDecider(T)@i 3. Point(face-lattice(T;eq)) \msubseteq{}r fset(fset(T + T)) 4. x : Point(face-lattice(T;eq))@i 5. y : Point(face-lattice(T;eq))@i 6. z : Point(face-lattice(T;eq))@i 7. \mforall{}s:fset(T + T) (s \mmember{} z {}\mRightarrow{} ((\muparrow{}ac-covers(union-deq(T;T;eq;eq);x;s)) \mvee{} (\muparrow{}ac-covers(union-deq(T;T;eq;eq);y;s))))@i 8. s : fset(T + T)@i 9. s \mmember{} z@i \mvdash{} \muparrow{}ac-covers(union-deq(T;T;eq;eq);x \mvee{} y;s) By Latex: (InstHyp [\mkleeneopen{}s\mkleeneclose{}] (-3)\mcdot{} THENA Auto) Home Index